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The cohomological equation for Roth type interval exchange maps | Stefano Marmi
; Pierre Moussa
; Jean-Christophe Yoccoz
; | Date: |
30 Mar 2004 | Subject: | Dynamical Systems; Complex Variables; Number Theory | math.DS math.CV math.NT | Abstract: | We exhibit an explicit full measure class of minimal interval exchange maps T for which the cohomological equation $Psi -Psicirc T=Phi$ has a bounded solution $Psi$ provided that the datum $Phi$ belongs to a finite codimension subspace of the space of functions having on each interval a derivative of bounded variation. The class of interval exchange maps is characterized in terms of a diophantine condition of ``Roth type’’ imposed to an acceleration of the Rauzy--Veech--Zorich continued fraction expansion associated to T. CONTENTS 0. Introduction 1. The continued fraction algorithm for interval exchange maps 1.1 Interval exchnge maps 1.2 The continued fraction algorithm 1.3 Roth type interval exchange maps 2. The cohomological equation 2.1 The theorem of Gottschalk and Hedlund 2.2 Special Birkhoff sums 2.3 Estimates for functions of bounded variation 2.4 Primitives of functions of bounded variation 3. Suspensions of interval exchange maps 3.1 Suspension data 3.2 Construction of a Riemann surface 3.3 Compactification of $M_zeta^*$ 3.4 The cohomological equation for higher smoothness 4. Proof of full measure for Roth type 4.1 The basic operation of the algorithm for suspensions 4.2 The Teichmüller flow 4.3 The absolutely continuous invariant measure 4.4 Integrability of $logVert Z_{(1)}Vert$ 4.5 Conditions (b) and (c) have full measure 4.6 The main step 4.7 Condition (a) has full measure 4.8 Proof of the Proposition Appendix A Roth--type conditions in a concrete family of i.e.m. Appendix B A non--uniquely ergodic i.e.m. satsfying condition (a) References | Source: | arXiv, math.DS/0403518 | Services: | Forum | Review | PDF | Favorites |
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